Find the locus of the points representing the complex number `z` for which`|z+5|^2-|z-5|^2=10.`

The locus of the point representing the complex number z for which |z+3|^2-|z-3|^2=15 is

The locus of the point representing the complex number z for which |z+3|^2-|z-3|^2=15 is

The locus of the points representing the complex numbers z for which |z|-2=|z-i|-|z+5i|=0 , is

The locus of the points representing the complex numbers z for which |z|-2=|z-i|-|z+5i|=0 , is

" The locus of the point representing the complex number "z" for which "|z+10i|^(2)-|z-10i|^(2)=20," is (where "i=sqrt(-1))

The points representing the complex numbers z for which |z+4|^2-|z-4|^2 = 8 lie on

The points representing the complex numbers z for which |z+3|^2 -|z-3|^2=0 lies on :

The locus of the point representing the complex number z for which |z+10i|^(2) - |z-10i|^(2)=20, is (where i=sqrt(-1) )

The points representing the complex numbers z for which |z+4|^(2)-|z-4|^(2)=8 lie on

The points representing the complex number z for which |z+3|^(2)-|z-3|^(2)=6 lie on